Question

Determine the volume of a solid by integrating a cross-section with a triangle Question The solid S has a base described by the circle x' + y2 = 9. Cross sections perpendicular to the x-axis and the base are isosceles right triangles with one leg on the circular base. What is the volume of S?

Answer 1

the circle Ретре Given solid base is bounded by x² + y2 = 9: cross-sectiona ndicular to x-axis, and the base are isoscles right Thongle with one leg circular base know that formula for volume using slicing method when cross-section peri- pendicular to x-anis given by. lies on Now we b 1V= / Alal da asxcb. Hege Ala)= area of cross-section A(X) = Area of isoscles right triangle with side length s..so A19) = įs 2 9 NOW x ²74 29 y=va-n2 s (3,9 x, (-3,0) -19-x2 SO Sa ay= 2119-12 Now 0 .so plug this Valve in All)= Icara-n2) ? = Ž 14 19-2²) Alu=2(9-x²)

and can that so SD NOW (a=-3 Now all the values in o .so 3 3 above figure we say a-coordinate value changes from 3 to 3. |-3.52237 (6=3 plug v=J 219-22. are VE 2[91-1 V = 2 (913) -(873) -> (91–3)1-3)] V=2(27-9] -26-27+9) V= 2127-9+27-9) V= 2(36] |V=72 Aue 2(36) = 72